English

Estimator Augmentation with Applications in High-Dimensional Group Inference

Methodology 2017-08-16 v2 Statistics Theory Statistics Theory

Abstract

To make inference about a group of parameters on high-dimensional data, we develop the method of estimator augmentation for the block Lasso, which is defined via the block norm. By augmenting a block Lasso estimator β^\hat{\beta} with the subgradient SS of the block norm evaluated at β^\hat{\beta}, we derive a closed-form density for the joint distribution of (β^,S)(\hat{\beta},S) under a high-dimensional setting. This allows us to draw from an estimated sampling distribution of β^\hat{\beta}, or more generally any function of (β^,S)(\hat{\beta},S), by Monte Carlo algorithms. We demonstrate the application of estimator augmentation in group inference with the group Lasso and a de-biased group Lasso constructed as a function of (β^,S)(\hat{\beta},S). Our numerical results show that importance sampling via estimator augmentation can be orders of magnitude more efficient than parametric bootstrap in estimating tail probabilities for significance tests. This work also brings new insights into the geometry of the sample space and the solution uniqueness of the block Lasso.

Keywords

Cite

@article{arxiv.1610.08621,
  title  = {Estimator Augmentation with Applications in High-Dimensional Group Inference},
  author = {Qing Zhou and Seunghyun Min},
  journal= {arXiv preprint arXiv:1610.08621},
  year   = {2017}
}

Comments

35 pages, 4 figures

R2 v1 2026-06-22T16:33:26.443Z